






















Let $K_v^*$ denote the complete graph $K_v$ if $v$ is odd and $K_v-I$, the complete graph with the edges of a 1-factor removed, if $v$ is even. Given non-negative integers $v, M, N, α, β$, the Hamilton-Waterloo problem asks for a $2$-factorization of $K^*_v$ into $α$ $C_M$-factors and $β$ $C_N$-factors. Clearly, $M,N\geq 3$, $M\mid v$, $N\mid v$ and $α+β= \lfloor\frac{v-1}{2}\rfloor$ are necessary conditions. Very little is known on the case where $M$ and $N$ have different parities. In this paper, we make some progress on this case by showing, among other things, that the above necessary conditions are sufficient whenever $M|N$, $v>6N>36M$, and $β\geq 3$.
此内容由惯性聚合(RSS阅读器)自动聚合整理,仅供阅读参考。 原文来自 — 版权归原作者所有。